The sum of the measures of the angles of all triangles is 180*. If one angel measures 45*, and the other 2 angels are equal, what is the measure of each of the other 2 angles?

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Anonymous · Answer

Since the sum of the measures of the angles of a triangle is 180*, and one angle measures 45*, the sum of the other two angles must be 180* - 45* = 135*.

Since the other two angles are equal, let's call each of them x*.

Therefore, the equation to find the measure of each of the other two angles is:
x + x = 135
2x = 135
x = 135 / 2
x = 67.5

Therefore, each of the other two angles measures 67.5*.

Tesfalem Haregot

The sum of the measures of the angles of all triangles is 180. If one angel measures 45, and the other 2 angels are equal, what is the measure of each of the other 2 angles?

1 answer

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